Unbounded expansion of polynomials and products

Abstract

Given d,s ∈ N, a finite set A ⊂eq Z and polynomials 1, …, s ∈ Z[x] such that 1 ≤ deg i ≤ d for every 1 ≤ i ≤ s, we prove that \[ |A(s)| + |1(A) + … + s(A) | s,d |A|ηs , \] for some ηs d s / s. Moreover if i(0) ≠ 0 for every 1 ≤ i ≤ s, then \[ |A(s)| + |1(A) … s(A) | s,d |A|ηs. \] These generalise and strengthen previous results of Bourgain--Chang, P\'alv\"olgyi--Zhelezov and Hanson--Roche-Newton--Zhelezov. We derive these estimates by proving the corresponding low-energy decompositions. The latter furnish further applications to various problems of a sum-product flavour, including questions concerning large additive and multiplicative Sidon sets in arbitrary sets of integers.